Slow and Ordinary Provability for Peano Arithmetic

Abstract

The notion of slow provability for Peano Arithmetic (PA) was introduced by S.D. Friedman, M. Rathjen, and A. Weiermann. They studied the slow consistency statement Cons that asserts that a contradiction is not slow provable in PA. They showed that the logical strength of PA+Cons lies strictly between that of PA and PA together with its ordinary consistency: PA⊂neq PA+Cons⊂neq PA+Con. This paper is a further investigation into slow provability and its interplay with ordinary provability in PA. We study three variants of slow provability. The associated consistency statement of each of these yields a theory that lies strictly between PA and PA+Con in terms of logical strength. We investigate Turing-Feferman progressions based on these variants of slow provability. We show that for our three notions, the Turing-Feferman progression reaches PA+Con in a different numbers of steps, namely 0, ω, and 2. For each of the three slow provability predicates, we also determine its joint provability logic with ordinary PA-provability.